Answer to Question #305390 in Differential Equations for Daemus

Question #305390

Under a certain condition , cane sugar in water is converted into dextrose at a rate proportional to the amount that is unconverted at any time . If 75 kg at t =; 0, 8 kg are converted during the first 30 minutes , find the amount converted in 2 hours .

Expert's answer

Let "m_0 = 75kg" be the initial mass of the shugar, "m" - is the amount of converted sugar. Thus, the differential equation of the process will be:

"\\dfrac{dm}{dt} = r(m_0-m)"

where "r" is the coefficient of proportionality. Solving the euqiation, obtain:

"m = m_0(1 - e^{-rt})"

Since "m = 8kg" at "t = 0.5hrs", obtain the coeffitient "r":

"r = -\\dfrac{1}{t}\\ln(1-\\dfrac{m}{m_0} ) = -\\dfrac{1}{0.5hrs}\\ln(1-\\dfrac{8kg}{75kg} ) \\approx 0.23hrs^{-1}"

At "t = 2hrs" obtain:

"m = 75kg\\cdot (1-e^{-0.23hrs^{-1}\\cdot 2hrs})\\approx 48kg"

Answer. 48kg.

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Answer to Question #305390 in Differential Equations for Daemus

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